A second order expansion in the local limit theorem for a branching system of symmetric irreducible random walks

Abstract

Consider a branching random walk, where the branching mechanism is governed by a Galton-Watson process, and the migration by a finite range symmetric irreducible random walk on the integer lattice Zd. Let Zn(z) be the number of the particles in the n-th generation at the point z∈ Zd. Under the mild moment conditions for offspring distribution of the underlying Galton-Watson, we derive a second order expansion in the local limit theorem for Zn(z) for each given z∈ Zd. That generalizes the results for simple branching random walks obtained by Gao [2018, SPA].